First of all, the theoretical modeling of the binary compounds Mg-chalcogen (S, Se, and Te), Be-chalcogen (S, Se, and Te) as well as their alloys for the configurations x = 0.25, 0.5, and 0.75 is carried out towards structural properties investigation. The SQS approach is applied by obtaining the small-unit-cell periodic structures for compositions x = 0.25, 0.50, and 0.75 in an eight atom cubic lattice. The ordered zinc-blende structures at x = 0.25 and 0.75 are obtained with space group #215_P-43m respectively, whereas for x = 0.50 the ordered structure is also eight atom with different space group #16_P222. Symmetry lattice constant a_o and bulk modulus B₀ have been computed by appropriate Murnaghan equation of states^[25] to the entire energy versus different volume curve. The results displayed in Table 1 show that the end binary values of lattice constant and bulk modulus are in good agreement with available experimental and theoretical values. Our GGA results of binary compounds agree well with the experimental results, despite GGA overestimating the lattice parameters.^[26] Although, in semiconductor alloys, the experimental^[27,28] and theoretical^[29,30] literature indicate the violation of Vegard’s law, our calculated results for all alloys show the non-linear variation of the lattice constant as a function of doping concentration of Be (x) (see Fig. 1), thus revealing tendency to Vegard’s law.^[31] Similarly, for bulk modulus, again our results deviate from the linear concentration dependence. Moreover, in ternary alloys, an increase of lattice constants leads into a corresponding decrease of bulk modulus and vice versa. This behavior can be attributed to the fact that changing the concentration of Be may result in the weakening/strengthening of the bonds.

Fig. 1.

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	Fig. 1. Schematic representation of (a) lattice constant and (b) bulk modulus with non-linear behavior in concentration x, for BexMg1−xX (X = S, Se, Te) alloys. Dotted lines represent the Vegard’s law.

Table 1.

Table 1.

Table 1. Predicted equilibrium lattice constant and bulk modulus for BexMg1−xX (X = S, Se, Te) alloys and their binary compounds compared to available experimental and other theoretical results. . Lattice constant a0/Å Bulk modulus B/GPa x This work Experiment Other calculations This work Experiment Other calculations BexMg1−xS 0 5.65 5.62a 5.70b, 5.65c, 4.745d 57.45 55.9b, 57.4c, 60.0d 0.25 5.45 65.14 0.50 5.26 74.98 0.75 5.05 84.08 1.0 4.84 4.87e 4.883g, 4.745h 98.95 105e 92.36g, 116h BexMg1−xSe 0 5.90 5.89a 5.99b, 5.90c, 5.92d 47.70 45.3b, 47.7c, 49.0d 0.25 5.74 54.51 0.50 5.55 61.32 0.75 5.35 68.91 1.0 5.13 5.137f 5.183g, 5.037h 75.86 92.2f 74.569g, 98.0h BexMg1−xTe 0 6.43 6.36a 6.51b, 6.43c, 6.39d 36.72 34.1b, 36.72c, 38d 0.25 6.25 40.33 0.50 6.04 46.46 0.75 5.83 52.91 1.0 5.61 5.617f 5.671g, 5.531h 60.86 68.8f 56.128g, 70.0h a Ref. [40] b Ref. [41] c Ref. [42] d Ref. [43] e Ref. [44] f Ref. [45] g Ref. [46] h Ref. [47].

Table 1. Predicted equilibrium lattice constant and bulk modulus for BexMg1−xX (X = S, Se, Te) alloys and their binary compounds compared to available experimental and other theoretical results. .

The investigation of electronic band structure (EBS) of a material is extensively important to understand its electronic properties along with valuable information regarding its potential practical use in fabricating new electronic devices. In this study, the theoretically calculated lattice constants are used to calculate the EBS dispersion in k-space beside the extraordinary symmetry directions in the irreducible Brillouin zone of the binary compounds Mg-chalcogen (S, Se, and Te), Be-chalcogen (S, Se, and Te) and their alloys for x = 0.25, 0.5, and 0.75 by employing the GGA and mBJ-GGA functionals. The computed band gap (energy variance between the top and the bottom of valence and conduction bands respectively) values are given in Table 2. It is manifest that the bandgaps computed with mBJ-GGA are very close to the experimental values, and are ominously enhanced as associated to the calculated values with GGA. Consequently, the mBJ exchange potential calculation is more active in calculating the band gap than the common LDA and GGA approximations.^[32,33]

Table 2.

Table 2.

Table 2. Direct and indirect band gap values of BexMg1−xX (X = S, Se, Te) alloys obtained by using WC GGA and mBJ-GGA approximations. . x WC-GGA mBJGGA Experiment Other work BexMg1−xS 0 3.25 5.15 4.45a 5.48d 0.25 3.20 4.95 0.50 3.05 4.35 0.75 2.95 4.20 1.0 5.60, 2.90 6.50, 4.10 5.5e 5.66f, 5.51g BexMg1−xSe 0 2.60 4.20 4.0b 3.67d 0.25 2.55 4.00 0.50 2.50 3.60 0.75 2.50 3.60 1.0 4.20, 2.40 5.60, 3.50 4-4.5e 4.19f, 4.72g BexMg1−xTe 0 2.35 3.60 3.67c 3.01d 0.25 2.20 3.15 0.50 1.60 2.10 0.75 1.90 2.70 1.0 3.60, 1.80 4.15, 2.60 2.70e 3.64f, 3.68g a Ref. [48] b Ref. [49] c Ref. [50] d Ref. [51] e Ref. [52] f Ref. [46] g Ref. [47].

Table 2. Direct and indirect band gap values of BexMg1−xX (X = S, Se, Te) alloys obtained by using WC GGA and mBJ-GGA approximations. .

It is noted that Mg-chalcogens (S, Se, and Te) are direct band gap semiconductors, while Be-chalcogens (S, Se, and Te) are indirect band gap semiconductors. The band gaps of these binary semiconductors are in good agreement with experimental results (see Table 2) and, on appraisal with additional theoretical results, display the reign of the mBJ potential used in our calculations. The partial substitution of Be in binaries MgS, MgSe, and MgTe is responsible of introducing band gap in the corresponding ternary alloys. Annihilation of a hole in VB caused by an electron in CB gives birth to the process of releasing excess energy as a photon. This process is called radiative recombination and is of great importance while suggesting a material more suitable for opto-electronic devices. In between the direct band gap and indirect band gap semi-conductors, radiative recombination is faster in former semi-conductors as compared to that in latter ones, consequently, dominating the direct band gap materials in the practical applications of opto-electronic devices. Referring to Figs. 2 and 3, the ternaries Be_xMg_1−xX (X = S, Se, Te) have direct band gaps at each composition and the location is given at Γ-symmetry point of the conduction band minimum (CBM) and valence band maximum (VBM). These CBM and VBM are taken to be the origin of the Γ–Γ wide direct band gap and their profiles, as well, are similar with only few minor changes around EF. The clarification of direct band gap of a material is highly significant because this gap plays a crucial role in deciding the material’s applications in opto-electronic devices.

Fig. 2.

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	Fig. 2. Schematic representation of calculated band structures for BexMg1−xX (X = S, Se, Te) alloys using GGA functional with concentration x = 0.25, 0.50, and 0.75.

Fig. 3.

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	Fig. 3. Schematic representation of calculated band structures for BexMg1−xX (X = S, Se, Te) alloys using mBJGGA functional with concentration x = 0.25, 0.50, and 0.75.

In Fig. 4, it may also be pointed out that fundamental band gap values calculated through WC-GGA and mBJ-GGA functionals at the concentrations considered in this study have a change, whereas the quadratic equations (given below) for these functionals help to analyze non-linearity in the band gap

Fig. 4.

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	Fig. 4. (color online) Direct bandgap variation (solid line) using WC-GGA and mBJGGA functionals for (a) BexMg1−xS, (b) BexMg1−xSe, and (c) BexMg1−xTe alloys at x = 0.0, 0.25, 0.50, 0.75, and 1.0. Dotted lines represent the indirect bandgaps of BexMg1−xX (X = S, Se, Te) alloys at x = 1.

Equations (1)–(3) are also used to calculate band gap bowing coefficients for the studied alloys. The band gap bowing coefficient has small (−0.057 eV, 0.6857 eV), intermediate (0.057 eV, 0.7428 eV) and large (1.1429 eV, 2.6837 eV) estimated values for Be_xMg_1−xSe, Be_xMg_1−xS, and Be_xMg_1−xTe alloys with WC-GGA and mBJ-GGA, respectively. Moreover, figure 5 reveals that the bowing deviates linearly for Be_xMg_1−xY (Y = S, Se, Te).

Fig. 5.

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	Fig. 5. (color online) Total density of states (TDOS) along with partial density of states (PDOS) using GGA and mBJGGA functionals at x = 0.25 for BexMg1−xX (X = S, Se, Te) alloys.

It is to orate stating at this point the consequence of supercell bulk of the compounds under study on the electronic properties. As stated previously, we have also executed band structure computation by means of larger (32-atom) supercells to understand the effects instigating from cumulating the numeral of neighboring atoms and symmetry decline on the electronic properties. Owing to decline of crystallographic equilibrium, at extraordinary symmetry points (excluding Γ-point) the band structure sketches for 8 and 32 atoms cells display significant dissimilarities, though, the direct (Γ–Γ) band gaps computed using WC-GGA, EV-GGA, and mBJLDA stay unaffected.

The electronic densities of states (TDOS and PDOS) for Be_xMg_1−xY (Y = S, Se, Te) alloys at x = 0.25 with GGA and mBJ-GGA functionals are displayed in Fig. 5. The analysis of ionic state contributions to the apiece set of bands is conceded out by disintegrating the TDOS into s, p, and d orbital assistances. The electrons in Be s, Mg s, and chalcogen (S, Se, and Te) s, p states are treated as valence electrons whereas the residual electrons are preserved as part of the core. On doping Be in Mg-chalcogen (S, Se, and Te), it is clear that low energy set of valance bands between −5.0 eV and 0 eV originates from Be s and chalcogen (S, Se and Te) p states. The bands below the Fermi-level between −14.0 eV and −12.0 eV are conquered by chalcogen (S, Se, and Te) s states, whereas the upper part of the conduction band is conquered by Mg s states. Referring to Fig. 5, one can conclude that no significant influence on structure features appears while using different XC potentials.

Inspecting the charge density maps, one is fully prompt to analyze the chemical bonding nature in a compound. Here, we use WC-GGA results to calculate outline maps of electronic charge density in (1 1 0) plane of Be_xMg_1−xX (X = S, Se, Te) ternaries at x = 0.25 as depicted in Fig. 6. These results help in examining the bonding properties of the studied materials. It is Pauling electro-negativity difference^[34] which decides the size of shared charge among the Be/Mg and chalcogen (S, Se and Te) ions, and this sharing of charge points out that the bonding nature is partially ionic but strongly covalent in Be_xMg_1−xX (X = S, Se, Te) alloys. It is quite plausible that charge transfer correspondingly increases with electro-negativity difference increase between cation and anion. The charge in the surroundings of cation sites is mainly due to the Be and Mg s sites, whereas chalcogen (S, Se, and Te) s and p sites bring the charge around anion sites. Furthermore, in Be_xMg_1−x(S, Se) ternaries, an increase of electronic charge is found at anion locations (S and Se), while the cation sites (Be/Mg) bear a net decrease of electronic charge. However, a reversed situation is observed in Be_xMg_1−xTe ternary where small electro-negativity of Te atom causes reduction of electronic charge at anion location (Te).

Fig. 6.

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	Fig. 6. (color online) Charge density distribution (contour plot) using GGA functional for BexMg1−xX (X = S, Se, Te) alloys at x = 0.25.

The optical properties of a material provide a sound understanding of its nature as well as a series of its optoelectronic applications.^[35–37] In this connection, the optical parameters of the alloys Be_xMg_1−xX (X = S, Se, Te) at x = 0.25, 0.50, 0.75 and their respective binaries are listed in Table 3, while the imaginary part of frequency reliant on dielectric function (DF) ε (ω) = ε_real(ω) − iε_imaginary(ω) is depicted in Fig. 5 in the radiation range 0–15 eV. In the present study, we prefer the local-field effects over the excitonic effects.^[38] We compute direct inter-band contributions towards the ε_imaginary(ω) part of DF by keeping all the possible transitions while going from occupied to unoccupied states into consideration and, also, considering the most suitable transition matrix element.^[39]

Table 3.

Table 3.

Table 3. Calculated optical parameters for BexMg1−xX (X = S, Se, Te) alloys at different Be concentrations. . Critical points values ε1 (0) R(0) n(0) ε2 K A σ BexMg1−xS This work Exp. Other Cal. This work Other Cal. 0 3.80 4.24a, 4.50b 0.100 1.90 2.02c 5.06 3.80 4.36 4.25 0.25 4.20 0.118 2.05 4.88 3.70 4.30 4.18 0.50 4.60 0.132 2.16 4.56 3.64 4.25 4.13 0.75 5.09 0.149 2.25 4.32 3.55 4.20 4.08 1 5.47 5.41e, 5.46f 0.160 2.15 2.30g 4.10 3.45 4.15 4.02 BexMg1−xSe 0 4.40 4.87a, 5.16b 0.127 2.10 2.14c 4.15 3.25 3.30 3.07 0.25 4.92 0.143 2.21 4.02 3.17 3.25 2.98 0.50 5.45 0.160 2.33 3.90 3.12 3.19 2.86 0.75 5.91 0.174 2.43 3.81 3.07 3.14 2.80 1 6.30 6.1d 6.15e,6.09f 0.185 2.51 2.45g 3.72 3.01 3.10 2.75 BexMg1−xTe 0 5.49 5.72a, 6.09b 0.160 2.34 3.07 1.94 2.58 2.58 0.25 6.19 0.182 2.49 2.74 1.82 2.50 2.45 0.50 7.18 0.208 2.68 2.58 1.40 2.28 1.74 0.75 7.59 0.218 2.75 2.24 1.75 2.45 2.38 1 7.95 7.50e 0.227 2.82 1.90g 2.05 1.68 2.37 2.26 a Ref. [53] b Ref. [54] c Ref. [55] d Ref. [56] e Ref. [57] f Ref. [58] g Ref. [59].

Table 3. Calculated optical parameters for BexMg1−xX (X = S, Se, Te) alloys at different Be concentrations. .

The energy eigen values along with electron wave functions take part in calculating the part ε_imaginary(ω) of DF, and ε_imaginary(ω) has strong correlation with joint DOS as well as with the momentum matrix element. These can be considered as natural output as band structure calculations. Among the DF associated direct and indirect interband transitions, the later transitions involve phonons scattering and are negligible due to their small contribution to DF.^[30] However, the process includes all the promising transitions while going from occupied to unoccupied states is executed to acquire the direct interband contributions to ε_imaginary(ω) part of DF. This imaginary part facilitates working out the ε_real(ω) part of DF with the support of Kramers–Kronig relations.^[38]

In order to have significantly improved band structure calculations, the two parameters, energy site and comparative amplitudes of explicit absorption, in DF are of great importance. Referring to Figs. 7(a)–7(c), there are strong absorption regions for the binary compounds Mg-chalcogen (S, Se, and Te), Be-chalcogen (S, Se, and Te) starting from 3.81 eV, 3.10 eV, and 2.79 eV, 5.14 eV, 4.11 eV, and 3.08 eV, ending at 13.96 eV, 11.91 eV, and 9.55 eV, 12.94 eV, 11.47 eV, and 9.41 eV, respectively. It is also obvious that ε_imaginary (ω) has a threshold nature and goes from maximum to minimum in these regions. The onset points (critical points) are presented in Table 3. The electronic transition between Mg-s, Be-s and chalcogen s and p states gives birth to the first peak. In the ternary alloys under discussion, the third energy range (4–12 eV) has prominent peaks. These results clearly point out that increasing Be concentration changes ε_imaginary (ω) detailed structure and, consequently, revealing the novel peaks present in energy assortment of higher value.

Fig. 7.

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	Fig. 7. 3D plot of imaginary part of dielectric function for BexMg1−xX (X = S, Se, Te) alloys at x = 0.0, 0.25, 0.50, 0.75, and 1.

The ε_real(ω) part of DF for the binary compounds Mg-chalcogen (S, Se, and Te), Be-chalcogen (S, Se, and Te) and their corresponding ternary alloys has been computed. The quantity ε_real (0), corresponding to zero frequency limits, is the electronic portion of stationary dielectric constant (DC) and found to be very important due to its connection to energy band gap such that both (ε_real (0) and energy band gap) are inversely related. This feature on doping Be in Mg-chalcogen (S, Se, and Te) compounds changes significantly. Referring to Table 4 which contains the values of static DC calculated for Be_xMg_1−xX (X = S, Se, Te) (0 < x < 1), our computed results have equitable contract with the experimental as well as additional theoretically predicted values.

The Mg chalcogenides are wide energy band gap materials attracting scientists and technologists to make their use in high temperature electronic and ultraviolet and blue-wavelength optics. On the other hand, other prime candidates for optoelectronic devices are the Be chalcogenides. Hence, an appropriate knowledge of the optical properties decides the applications of these materials in photonic industry. For the ternaries Be_xMg_1−xX (X = S, Se, Te) in assortment 0 < x < 1, we have also calculated some other optical parameters for example refractive indices, reflectivity, absorption coefficient, and optical conductivity. For the studied alloys, only the critical transition points are listed in Table 3, which also indicates that zero frequency boundary of dielectric function, refractive index, and reflectively find a rise with decreasing energy band values.